projectivization

Noun

 * 1)  A process (more formally, a mapping) that, given a vector space, specifies an associated projective space;  the projective space so specified.
 * 2) * 1997, M. E. Alferieff (translator), Alexei Kostrikin, Yuri Manin, Linear Algebra and Geometry, Gordon and Breach Science Publishers, Paperback, page 233,
 * Therefore, the projectivization $$P(f)$$ is determined only on the complement $$U_f = P(L)\backslash P(\ker f)$$.
 * Therefore, the projectivization $$P(f)$$ is determined only on the complement $$U_f = P(L)\backslash P(\ker f)$$.